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Notions of relative ubiquity for invariant sets of relational structures
Journal of Symbolic Logic 55 (3):948-986 (1990)
Abstract
Given a finite lexicon L of relational symbols and equality, one may view the collection of all L-structures on the set of natural numbers ω as a space in several different ways. We consider it as: (i) the space of outcomes of certain infinite two-person games; (ii) a compact metric space; and (iii) a probability measure space. For each of these viewpoints, we can give a notion of relative ubiquity, or largeness, for invariant sets of structures on ω. For example, in every sense of relative ubiquity considered here, the set of dense linear orderings on ω is ubiquitous in the set of linear orderings on ωLinks
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Citations of this work
Quantifier Elimination for a Class of Intuitionistic Theories.Ben Ellison, Jonathan Fleischmann, Dan McGinn & Wim Ruitenburg - 2008 - Notre Dame Journal of Formal Logic 49 (3):281-293.
References found in this work
On the Borel classification of the isomorphism class of a countable model.Arnold W. Miller - 1983 - Notre Dame Journal of Formal Logic 24 (1):22-34.
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